8. Let R denote the ring 2Z1/(1+ 3i). (a) Show that i- 3 € (1+3i) and that [i] = [3] in R. Use this to prove that [10] = [0] in R and that [a + bi] = [a + 3b] where a, be Z. %3D (b) Show that the unique ring homomorphism p : Z → R is surjective. (c) Show that 1+ 3i is not a unit and that 1+3i does not divide 2 and 5 in Zi). Conclude that ker p 10Z. %3D

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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8. Let R denote the ring Z[i]/(1+ 3i).
(a) Show that i – 3 € (1+3i) and that [i] = [3] in R. Use this to prove that [10] = [0] in R
and that [a + bi] = [a + 36] where a, be Z.
-
%3D
(b) Show that the unique ring homomorphism
p:Z → R
is surjective.
(c) Show that 1 + 3i is not a unit and that 1+3i does not divide 2 and 5 in Z[i]. Conclude
that ker p = 102.
(d) Show that R = Z/10Z.
Transcribed Image Text:8. Let R denote the ring Z[i]/(1+ 3i). (a) Show that i – 3 € (1+3i) and that [i] = [3] in R. Use this to prove that [10] = [0] in R and that [a + bi] = [a + 36] where a, be Z. - %3D (b) Show that the unique ring homomorphism p:Z → R is surjective. (c) Show that 1 + 3i is not a unit and that 1+3i does not divide 2 and 5 in Z[i]. Conclude that ker p = 102. (d) Show that R = Z/10Z.
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